Question

What is the general solution of the differential equation? : `(ylny)dx-xdy=0`

Answer 1

`y = e^(Ax)`

Explanation:

We have:

`(ylny)dx - xdy=0` ..... [A]

This is a separable Differential Equation so we can collect terms and write it in separated differential form and integrate:

`\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ x \ dy = ylny \ dx`

`:. int \ 1/(ylny) \ dy = int \ 1/x \ dx` ..... [B]

The RHS integral is trivial, and the LHS initially seems quite daunting, but if we perform, the substitution:

`u = ln y => (du)/dy = 1/y`

Substituting into [B], we find

`int \ 1/(ylny) \ dy = int \ 1/y 1/lny \ dy`
`" " = int \ 1/u \ du`
`" " = ln|u|`
`" " = ln|lny|`, after restoring the substitution.

Using this result, we can now integrate [B] to get an Implicit General Solution:

`:. ln|lny| = lnx + C`
`:. ln|lny| = lnx + lnA`, say
`:. ln|lny| = lnAx`

We would typically want an explicit solution (where possible), so we can take exponential to base `e` (or anti-logarithms), giving:

`|lny| = Ax`

And after again taking exponents, and noting that the exponential function is positive over its entire domain (`e^x gt 0 AA x in RR`) we can write:

`y = e^(Ax)`

Which is the Explicit General Solution